Solve

Problem 2601

7) Find m Am \angle \mathrm{~A}

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Problem 2602

Question 34
Find the distance between C(2,4)C(2,4) and D(5,7)D(5,7). Round to the nearest tenth, if necessary. about \square units

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Problem 2603

Question 13 Given logm6=12\log _{m} \sqrt{6}=\frac{1}{2}, find the value of mm. Type here

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Problem 2604

3. Use sin, cos or tan to find the * 5 points missing side. A. X=16X=16 B. X=8X=8 C. X=11X=11 D. X=15X=15 AA BB C D

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Problem 2605

C A B A new bridge structure requires triangles that are in a ratio of 1:1. If AC = 4x-3 and EC = 2x + 6, find the distance between the top and bottom of the bridge, in feet. O 4.5 ft 15 ft 18 ft O 30 ft

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Problem 2606

Assume simulitis is spreading through a population of 800 individuals. For this strain of simulitis, absent any constraints, each infected individual would cause another 1.5 infections per week, and the disease would thus initially spread at a rate of 150%150 \% per week.
If the initial number of infections is given by P0=80P_{0}=80, find the number of infections after one week and after two weeks. Round answers to the nearest whole number of cases, but only after completing the calculations.
After 1 week, there are \square cases.
After 2 weeks, there are \square cases.

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Problem 2607

920 matembtico
3. En una lata de bizcochos, hay 4 bizcochos de trocitos de chocolate y 3 de harina de avena. Si un nifo toma al azar 2 bizcochos, ¿cuál es la probabilidad de que los 2 bizcochos sean de trocitos de chocolate?
4. En un sorteo, se extraen de a dos por vez los nombres de los participantes, La primera persona favorecida gana un premio de $500\$ 500 y la segunda persona, un premio de $100\$ 100. Los participantes del sorteo pueden ingresar su nombre una sola vez y se registraron 400 personas. Si ya se ha otorgado el primer premio, ¿qué probabilidad existe de ganar el segundo premio?
5. La tabla siguiente muestra datos de un estudio sobre 46 estudiantes de una escuela superior local. Cada número representa el total de estudiantes que pertenecen a esa categoría. \begin{tabular}{lll} & \begin{tabular}{l} Vive hasta 5\mathbf{5} millas \\ de la escuela \end{tabular} & \begin{tabular}{l} Vive a más de 5\mathbf{5} millas \\ de la escuela \end{tabular} \\ \hline \begin{tabular}{l} Planea ir a la \\ universidad \end{tabular} & 10 & 25 \\ \hline \begin{tabular}{l} No planea ir a la \\ universidad \end{tabular} & 8 & 3 \\ \hline \end{tabular}

Si se selecciona al azar a un estudiante, ¿cuál es la probabilidad de que este viva hasta 5 millas de la escuela y planee ir a la universidad?

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Problem 2608

For the pair of polynomials given, select all the points of intersection of their graphs. g(x)=(x+7)(x5)h(x)=x5\begin{array}{l} g(x)=(x+7)(x-5) \\ h(x)=x-5 \end{array} A. (8,13)(-8,-13) B. (7,0)(-7,0) C. (5,10)(-5,-10) D. (6,11)(-6,-11) E. (5,0)(5,0)

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Problem 2609

8v=42+v8 v=42+v
Simplify your answer as much as possible. v=v= \square
Start over

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Problem 2610

log(x+5)+log(x5)=4log2+2log3\log (x+5) + \log (x-5) = 4 \log^2 + 2 \log^3

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Problem 2611

7±7)24(2)(3)2(2)\frac{-7 \pm \sqrt{7)^{2}-4(-2)(-3)}}{2(-2)}

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Problem 2612

x2+4x+4=49x^{2}+4 x+4=49

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Problem 2613

ctivity 1: Finding Complex Solutions Ive these equations by completing the square. x28x+13=0x^{2}-8 x+13=0
2. x28x+19=0x^{2}-8 x+19=0

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Problem 2614

Determine tan2x\tan 2 x for cscx=4\csc x=4, where xx is in Quad I.

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Problem 2615

The third and fourth terms of an arithmetic sequence are the first and second terms of a geometric sequence. If the first two terms of the arithmetic sequence are 5,2 , then what is the fourth term of the geometric sequence?

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Problem 2616

Video
A shopper pays $37.08\$ 37.08 for a $36\$ 36 dry erase board after sales tax is added. What is the sales Questions answered tax percentage?
Write your answer using a percent sign (\%). \square Time elapsed 6 Submit 00 05 34 HR MIN SEC SmartScore out of 100 43

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Problem 2617

Solve the following system of equations. {x2+y2=13y2x=4\left\{\begin{array}{l} x^{2}+y^{2}=13 \\ y-2 x=4 \end{array}\right.

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Problem 2618

A slow pitch softball diamond is actually a square 61 ft on a side. How far is it from home to second base?
It is \square \square from home to second base. (Round to the nearest tenth as needed.)

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Problem 2619

3 In Exercises 25-38, solve each equation by the method of your choice. Support your solution by a second method.
31. ex+ex2=4\frac{e^{x}+e^{-x}}{2}=4
32. 2e2x+5ex3=02 e^{2 x}+5 e^{x}-3=0
33. 5001+25e0.3x=200\frac{500}{1+25 e^{0.3 x}}=200
34. 4001+95e0.6x=150\frac{400}{1+95 e^{-0.6 x}}=150
35. 12ln(x+3)lnx=0\frac{1}{2} \ln (x+3)-\ln x=0
36. logx12log(x+4)=1\log x-\frac{1}{2} \log (x+4)=1

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Problem 2620

iviy inc Learning Assessment Analytics Janely Seventh grade P. 8 Find the percent: tax, discount, and more You have prizes to reveall go to your game board.
Mattresses originally priced at $5,050\$ 5,050 are now on sale for $3,939\$ 3,939. What is the discount, as a Video (6) Questions answered percentage?
Write your answer using a percent sign (\%). \square 10 Time elapsed 00 11 18 HR MIN sec SmartScore out of 100 64 Submit

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Problem 2621

Compute (27)23(32)35(-27)^{\frac{2}{3}}-(-32)^{\frac{-3}{5}}

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Problem 2622

Solve the equation. Give a general formula for all the solutions. 2cosx1=02 \cos x-1=0
Select the correct choice below and, if necessary, fill in the answer box to complete your choice. A. x=\mathrm{x}= \square (Simplify your answer. Type your answer(s) as an expression, using nn as the variable, in the form a+bna+b n where 0a<2π0 \leq a<2 \pi. Type any angle measures in radians, using π\pi as needed. Use integers or fractions for any numbers in the expression. Use a comma to separate answers as needed.) B. There is no solution.

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Problem 2623

2) 2sin2x=sinx2 \sin ^{2} x=\sin x

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Problem 2624

Find the standard deviation of the data set, rounded to the nearest hundredth. (2 points) \begin{tabular}{|l|l|l|l|l|l|} \hline Data Point & 15 & 18 & 11 & 17 & 14 \\ \hline Difference & 0 & 3 & -4 & 2 & -1 \\ \hline Squared & 0 & 9 & \square & 4 & 1 \\ \hline \end{tabular}
The standard deviation of the dataset is \square Check answer Remaining Attempts : 3

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Problem 2625

AD1 \& AD2: Product and Quotient Rules Differentiate the following functions. Show the [][\cdot]^{\prime} step in your work.
1. f(x)=(x4+5x1)(3x+2)f(x)=\left(x^{4}+5 x-1\right) \cdot(3 x+2)
2. g(x)=2x4+7x5x+1g(x)=\frac{2 x^{4}+7 x}{5 x+1}

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Problem 2626

(a) Use the Pythagorean theorem to determine the length of the unknown side of the triangle, (b) determine the perimeter of the triangle, and (c) determine the area of the triangle. The figure is not drawn to scale. a. The length of the unknown side is \square \square (Type a whole number.) b. The perimeter of the triangle is \square \square (Type a whole number.) c. The area of the triangle is \square \square (Type a whole number.)

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Problem 2627

Bookwork code: 2B Calculator allowed
Charlotte spun a spinner a total of 200 times and worked out the estimated probability of it landing on green after different numbers of spins. Her results are shown in the table below. a) What is the best estimate for the probability of landing on green? Give your answer as a fraction in its simplest form. b) Copy and complete the sentence below, using one of the options to explain why your answer to part a) is the best estimate. \begin{tabular}{|c|c|c|c|c|c|} \hline Number of spins & 5 & 10 & 20 & 100 & 200 \\ \hline Estimated probability & 15\frac{1}{5} & 15\frac{1}{5} & 14\frac{1}{4} & 19100\frac{19}{100} & 1150\frac{11}{50} \\ \hline \end{tabular} b) This is the best estimate because it \qquad involves the smallest number of trials is the largest involves the largest number of trials is the mean Previous Watch video Answer

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Problem 2628

z2+2z+2=0x=b±b24ac2aa=2x2+bx+c=02c=2b=24ac=b2=2a=\begin{array}{c}z^{2}+2 z+2=0 \\ x=\frac{-b \pm \sqrt{b^{2}-4 a c}}{2 a} \\ a=\frac{2 x^{2}+b x+c=0}{2} \quad c=2 \\ -b=-2 \quad 4 a c= \\ b^{2}=\quad 2 a=\end{array}

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Problem 2629

Problem 1. (6 points) Compute the following limits: (a) (2 points) limn4n7+4n4+34+3n4+4n7\lim _{n \rightarrow \infty} \frac{4 n^{7}+4 n^{4}+3}{4+3 n^{4}+4 n^{7}} (b) (2 points) limn(4n+34n3)4n+12\lim _{n \rightarrow \infty}\left(\frac{4 n+3}{4 n-3}\right)^{4 n+12} (c) (2 points) limn7n+4cos(n)n\lim _{n \rightarrow \infty} \sqrt[n]{7^{n}+4 \cos (n)}

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Problem 2630

3. f(x)=9x+8g(x)=9+3xf(x)=9 x+8 \quad g(x)=9+3 x Find h(x)=f(x)+g(x)h(x)=f(x)+g(x).

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Problem 2631

5xy+ex+y=4-5 \cdot x \cdot y+e^{x+y}=4 a. Find dy dx\frac{\mathrm{d} y}{\mathrm{~d} x} in terms of xx and yy. dy dx=\frac{\mathrm{d} y}{\mathrm{~d} x}= aba^{b} sin(a)\sin (a) xf\frac{\partial}{\partial x} f : \infty α\alpha Ω\Omega 5yex+yex+y5x\frac{5 y-e^{x+y}}{e^{x+y}-5 x} b. Find the value of dydx\frac{d y}{d x} at the point P(5,5)P(\sqrt{5},-\sqrt{5}). dy dx(5,5)=\left.\frac{\mathrm{d} y}{\mathrm{~d} x}\right|_{(\sqrt{5},-\sqrt{5})}=

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Problem 2632

Based on a poll, among adults who regret getting tattoos, 12%12 \% say that they were too young when they got their tattoos. Assume that five adults who regret getting tattoos are randomly selected, and find the indicated probability. Complete parts (a) through (d) below. a. Find the probability that none of the selected adults say that they were too young to get tattoos. 0.5277 (Round to four decimal places as needed.) b. Find the probability that exactly one of the selected adults says that he or she was too young to get tattoos. 0.3598 (Round to four decimal places as needed.) c. Find the probability that the number of selected adults saying they were too young is 0 or 1 . \square (Round to four decimal places as needed.)

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Problem 2633

Solve for ww. 2(2w+5)6w=4(w3)8-2(-2 w+5)-6 w=4(w-3)-8
Simplify your answer as much as possible.

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Problem 2634

Calculate the interquartile range of the skewed dataset 0,2,6,7,7,7,8,8,8,8,8,9,9,9,100,2,6,7,7,7,8,8,8,8,8,9,9,9,10 (1 point)
The interquartile range= \square
Check answer Remaining Attempts : 3

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Problem 2635

c. Compute the variance and standard deviation of the probability distribution. Round each result to 4 decimal places, if necessary. \begin{tabular}{|r|r|r|r|r|r|} \hlinexx & P(x)P(x) & xP(x)x \cdot P(x) & xμx-\mu & (xμ)2(x-\mu)^{2} & (xμ)2P(x)(x-\mu)^{2} \cdot P(x) \\ \hline 3 & 0.19 & 0.57 & -1.66 & 2.7556 & 0.5236 \\ \hline 4 & 0.2 & 0.8 & -0.66 & 0.4356 & 0.0871 \\ \hline 5 & 0.37 & 1.85 & 0.34 & 0.1156 & 0.0428 \\ \hline 6 & 0.24 & 1.44 & 1.34 & 1.7956 & 0.4309 \\ \hline \end{tabular} σX2=σX=\begin{array}{l} \sigma_{X}^{2}=\square \\ \sigma_{X}=\square \end{array} d. What is the probability that x4x \leq 4 ? \square

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Problem 2636

4(x6)2=364(x-6)^{2}=36

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Problem 2637

Find the solution of the system of equations. 15x10y=305x9y=7\begin{array}{c} 15 x-10 y=-30 \\ 5 x-9 y=7 \end{array}

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Problem 2638

Solve for xx. 3log3(2x)=9-3 \log _{3}(-2 x)=-9

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Problem 2639

Solve for the exact value of xx. log7(2x)2log7(8)=1\log _{7}(2 x)-2 \log _{7}(8)=1

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Problem 2640

Find the missing values in the income statement. What are the net sales? \begin{tabular}{|l|c|} \hline \multicolumn{2}{|c|}{ Income Statement } \\ \hline Sales & $600,000\$ 600,000 \\ \hline Returns & $(25,000)\$(25,000) \\ \hline Net Sales & $[?]\$[?] \\ \hline COGS & $(150,000)\$(150,000) \\ \hline Gross Profit & $\$ \\ \hline Overhead & $(100,000)\$(100,000) \\ \hline Net Income & $\$ \\ \hline \end{tabular}
Enter

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Problem 2641

Solve for the exact value of xx. log6(3x)+2log6(3)=4\log _{6}(3 x)+2 \log _{6}(3)=4

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Problem 2642

olve for the exact value of xx. 5ln(5x+9)4=115 \ln (5 x+9)-4=11

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Problem 2643

Solve the following log equation: ln(2x5)=ln(x+3)\ln (2 x-5)=\ln (x+3)
Type your answer in the form x=x= \qquad -

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Problem 2644

log4256+logx(116)=2\log _{4} 256+\log _{x}\left(\frac{1}{16}\right)=2

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Problem 2645

Find the exact value of sin7π4\sin \frac{7 \pi}{4} sin7π4=\sin \frac{7 \pi}{4}=

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Problem 2646

7
Consider the following data set. 2,3,4,5,8,8,122,3,4,5,8,8,12
7 Fill in the Blank 0.15 points Calculate the mean for the data set. xˉ=\bar{x}= type your answer...

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Problem 2647

Use the change of base formula to compute log35\log _{3} 5. Round your answer to the nearest thousandth.

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Problem 2648

Concord Company identifies three activities in its manufacturing process: machine setups, machining, and inspections. Estimated annual overhead cost for each activity is $163,300,$428,400\$ 163,300, \$ 428,400, and $89,300\$ 89,300, respectively. The cost driver for each activity and the estimated annual usage are number of setups 2,300 , machine hours 25,200 , and number of inspections 1,900.
Compute the overhead rate for each activity.
Machine setups \ \square$ per setup
Machining \ \square$ per machine hour
Inspections \ \square$ per inspection

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Problem 2649

The line kk has a slope of -2 . The line jj makes an angle of 3030^{\circ} with kk. Find one possible value of the slope of the line jj. Give your answer in the form d+efd+e \sqrt{f}, where d,e,fZd, e, f \in \mathbb{Z}.

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Problem 2650

Finding a final amount in a word problem on exponential growth or decay
A principal of $4400\$ 4400 is invested at 8.5%8.5 \% interest, compounded annually. How much will the investment be worth after 8 years? Use the calculator provided and round your answer to the nearest dollar. \square

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Problem 2651

Assume that when human resource managers are randomly selected, 48%48 \% say job applicants should follow up within two weeks. If 25 human resource managers are randomly selected, find the probability that exactly 17 of them say job applicants should follow up within two weeks.
The probability is \square (Round to four decimal places as needed.)

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Problem 2652

Find the zz-score that has 67.4%67.4 \% of the distribution's area to its right.
The z -score is \square 0.07 (Round to two decimal places as needed.)

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Problem 2653

Calculate the percent change in overhead from Quarter 1 to Quarter 2 from the following income statement information: \begin{tabular}{lcc} & Q1 (x1000) & Q2 (x1000) \\ Net Sales & 110 & 170 \\ COGS & 18 & 32 \\ Gross Profit & 92 & 138 \\ Overhead & 30 & 50 \\ Net Income & 62 & 88 \\ \multicolumn{3}{r}{ Percent } \\ Change == & {[?]%[?] \%} \end{tabular}
Enter your answer as a percent rounded to the nearest tenth. \square Enter

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Problem 2654

Crane Inc. has conducted the following analysis related to its product lines, using a traditional costing system (volume-based) and an activity-based costing system. The traditional and the activity-based costing systems assign the same amount of direct materials and direct labor costs. \begin{tabular}{|c|c|c|c|} \hline \multicolumn{4}{|c|}{Total Costs} \\ \hline Products & Sales Revenue & Traditional & ABC \\ \hline Product 540X & \$195,000 & \$53,000 & \$45,900 \\ \hline Product 137Y & 155,000 & 48,000 & 34,625 \\ \hline Product 2495 & 75,000 & 10,000 & 30,475 \\ \hline \end{tabular} (a)
For each product line, compute operating income using the traditional costing system.
Product 540X \ \squareProduct137Y$ Product 137Y \$ \squareProduct249S$ Product 249S \$ \square$

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Problem 2655

Solve for xx. 3+10x=123+\frac{10}{x}=\frac{1}{2}
Simplify your answer as much as possible. x=x=

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Problem 2656

Translate to a proportion and solve. What is 2%2 \% of 7000?7000 ? 2%2 \% of 7000 is \square (Type a whole number or a decimal.)

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Problem 2657

5=27b+75=\frac{2}{7 b}+7
Simplify your answer as much as possible. b=b=

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Problem 2658

Use algebraic procedures to find the exact ln(x24)=ln(x+16)x=\begin{array}{l} \ln \left(x^{2}-4\right)=\ln (x+16) \\ x=\square \end{array}

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Problem 2659

3-6 Credit Card Statement
Exercises
1. The summary portion of Manny Ramira's credit card statement is shown. Determine the new balance amount. \begin{tabular}{|c|c|c|c|c|c|c|c|} \hline \multirow{3}{*}{SUMMARY} & \multirow[t]{2}{*}{Previous Balance} & \multirow[t]{2}{*}{Payments or credis} & \multirow[t]{2}{*}{Transactions} & \multirow[t]{2}{*}{ Late  Charge \begin{array}{l} \text { Late } \\ \text { Charge } \end{array}} & finance Charge & \multirow[t]{2}{*}{Balance} & Minimum Payment \\ \hline & & & & & $9.56\$ 9.56 & & \\ \hline & 1.237.56 & \1,200;00 & \$2,560,67 & (2.00 & & & \\ \hline \end{tabular}
2. Lizzy has a credit line of \9,000 9,000 on her credit card. Her summary is shown. What is her available credit balance? \begin{tabular}{|c|c|c|c|c|c|c|c|} \hline \multirow[b]{2}{*}{SUMMARY} & Previous Balance & Payments C Credts & Transactions &  Cate  Charge \begin{array}{l} \text { Cate } \\ \text { Charge } \end{array} & Change & Batarico & \begin{tabular}{l} Minimum \\ Payment \end{tabular} \\ \hline & \6.500.56 & \5.200.00 5.200 .00 & \978.45 & \20.00 20.00 & \12.88 & & \\ \hline \end{tabular}
3. Rich had a previous balance of xdollarsandmadeanontimecreditcardpaymentof dollars and made an on-time credit card payment of ydollarswhere dollars where y.Hehasacreditlineof10,000dollarsandwillhavetopay. He has a credit line of 10,000 dollars and will have to pay
\15.50 15.50 in finance charges. Rich made purchases totaling $1,300.30\$ 1,300.30. Write an algebraic expression that represents his current available credit.
4. Determine the error that was made using the following summary statement. \begin{tabular}{|c|c|c|c|c|c|c|c|} \hline \multirow[b]{2}{*}{SUMMARY} & \begin{tabular}{l} Previous \\ Balance \end{tabular} & \begin{tabular}{l} Payrients \\ Credts \end{tabular} & Transactions & Late Charge & Finance Charge & New Balarce & niminum Payment \\ \hline & \350.90 & \$200.00 & \$200.00 & \$0.00 & \$8.68 & \759.58 759.58 & \\ \hline \end{tabular}
5. Marianne has a credit card with a line of credit at $15,000\$ 15,000. She made the following purchases: $1,374.90,$266.21,39.46\$ 1,374.90, \$ 266.21,39.46, and $903.01\$ 903.01. What is Marianne's available credit?
6. Luke has a credit line of $8,500\$ 8,500 on his credit card. He had a previous balance of $4,236.87\$ 4,236.87 and made a $3,200.00\$ 3,200.00 payment. The total of his purchases is $989.42\$ 989.42. What is Luke's available credit?
7. The APR on Ramona's credit card is currently 24.6%24.6 \%. What is the monthly periodic rate?
8. Sheila's monthly periodic rate is 2.41%2.41 \%. What is her APR?
9. Examine the summary section of a monthly credit card statement. Calculate the new balance. \begin{tabular}{|c|c|c|c|c|c|c|c|} \hline \multirow[b]{2}{*}{SUMMARY} & \begin{tabular}{l} Previous \\ Balance \end{tabular} & Payments Credits & Transactions & late Charge & Finance Charge & \qquad & \begin{tabular}{l} Mininum \\ Payment \end{tabular} \\ \hline & $876.34\$ 876.34 & 8800.00 & \1,009.56 & \$30.00 & \$29.67 & & \18.00 18.00 \\ \hline \end{tabular}

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Problem 2660

Use algebraic procedures to find the exact so log3x+log3(x+6)=3x=\begin{array}{l} \log _{3} x+\log _{3}(x+6)=3 \\ x=\square \end{array}

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Problem 2661

18. The approximate value of xx in the equation 17x1=12x+317^{x-1}=12^{x+3} is A. 10.6 B. 12.6 C. 29.5 D. 31.5

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Problem 2662

Solve the logarithmic equation. log6x=4x=\begin{array}{l} \log _{6} x=4 \\ x=\square \end{array} \square (Simpary your answer. Type an exact answer, using ee as needed.)

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Problem 2663

A consumer agency randomly selected 1700 flights from two major airlines, AA and BB. The Alowing table gives the classification of these flights based on their arrival time: \begin{tabular}{|l|c|c|c|c|} \hline Airline & <30 min<30 \mathrm{~min} late & 3060 min30-60 \mathrm{~min} late & More 60 min late & \multicolumn{1}{|l|}{ Total } \\ \hline Airline A & 429 & 390 & {[92[92} & 911 \\ \hline Airline B & 393 & 316 & 80 & {[789[789} \\ \hline Total & 822 & 706 & 172 & 1700 \\ \hline \end{tabular} a) If a flight is selected at random, what is the probability that it is a flight from airline AA and more than 60 minutes late?

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Problem 2664

2x+532x+5=2\sqrt{2 x+5}-\frac{3}{\sqrt{2 x+5}}=-2

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Problem 2665

7 5 124° 6 3 4x 4 2 What is the value of x?

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Problem 2666

ercices et Résolution de problèmes : Trouve la valeur de : 25(log52)25\left(-\log _{5} \sqrt{2}\right)

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Problem 2667

Name I scebel Garcia Date \qquad
Exercises
1. The summary portion of Manny Ramira's credit card statement is shown. Determine the new balance amount.
2. Lizzy has a credit line of $9,000\$ 9,000 on her credit card. Her summary is shown. What is her available credit balance?
3. Rich had a previous balance of xx dollars and made an on-time credit card payment of yy dollars where y<xy<x. He has a credit line of 10,000 dollars and will have to pay $15.50\$ 15.50 in finance charges. Rich made purchases totaling $1,300.30\$ 1,300.30. Write an algebraic expression that represents his current available credit.
4. Determine the error that was made using the following summary statement.
5. Marianne has a credit card with a line of credit at $15,000\$ 15,000. She made the following purchases: $1,374.90,$266.21,39.46\$ 1,374.90, \$ 266.21,39.46, and $903.01\$ 903.01. What is Marianne's available credit?
6. Luke has a credit line of $8,500\$ 8,500 on his credit card. He had a previous balance of $4,236.87\$ 4,236.87 and made a $3,200.00\$ 3,200.00 payment. The total of his purchases is $989.42\$ 989.42. What is Luke's available credit?
7. The APR on Ramona's credit card is currently 24.6%24.6 \%. What is the monthly periodic rate?
8. Sheila's monthly periodic rate is 2.41%2.41 \%. What is her APR?
9. Examine the summary section of a monthly credit card statement. Calculate the new balance. 58 Financial Algebra Workbook 3-6 (c) 2016 Cengage Learning. All Rights Reserved. May not be scanned, copied or duplicated, or posted to a publicly accessible website, in whole or in part.

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Problem 2668

What is the value of xx ?

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Problem 2669

What is the value of xx ?

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Problem 2670

Question Watch Video Show Examples
What is an equation of the line that passes through the points (2,5)(2,5) and (3,6)(3,6) ?
Answer Attempt 1 out of 2 Submit Answer

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Problem 2671

Suppose that w=x2exp(2y)cos(6z)w=x^{2} \cdot \exp (2 y) \cdot \cos (6 z) with x=sin(t+π2)y=ln(t+7)z=t\begin{array}{c} x=\sin \left(t+\frac{\pi}{2}\right) \\ y=\ln (t+7) \\ z=t \end{array} a. Find dw dt\frac{\mathrm{d} w}{\mathrm{~d} t} in terms of tt. dw dt=\frac{\mathrm{d} w}{\mathrm{~d} t}= aba^{b} sin(a)xf\sin (a) \quad \frac{\partial}{\partial x} f : \infty α\alpha Ω\Omega

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Problem 2672

of Lines
Question Watch Video Show Examples bints (Point
What is an equation of the line that passes through the points (5,6)(5,-6) and (5,2)(-5,-2) ? = C from Answer Attempt 1 out of 2

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Problem 2673

HW 13 (Law of Sines) Progress saved Done Score: 11/32 Answered: 5/9
Question 6 0/10 / 1 pt
A 80 -foot tower is leaning to the right, making an angle of 120120^{\circ} with the ground. A 106 -foot wire has been attached to the top of the tower and anchored to the ground to the left of the tower. What angle does the wire make with the ground? \square Submit Question

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Problem 2674

15. Solve the equation beliow for a w=7a+4bw=7 a+4 b A. a=w7b4a=\frac{w-7 b}{4} B. a=w74ba=\frac{w}{7}-4 b C. a=w4b7a=\frac{w-4 b}{7} D. a=w728ba=\frac{w}{7}-28 b

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Problem 2675

At a particular restaurant, each onion ring has 40 calories and each pizza roll has 80 calories. A combination meal with pizza rolls and onion rings is shown to have 800 total calories and 4 more pizza rolls than onion rings. Graphically solve a system of equations in order to determine the number of onion rings in the combination meal, xx, and the number of pizza rolls in the combination meal, yy. y Click twice to plot each line. Click a line to delete it. Sign out 1 Nov 14 3:23 EXTD

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Problem 2676

Solve the following equation. 47.5 is 912%9 \frac{1}{2} \% of what number? \square (Type an integer or a decimal.)

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Problem 2677

Question Watch Video
Evaluate the expression shown below and write your answer as a mixed number in simplest form. 612×9106 \frac{1}{2} \times \frac{9}{10}

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Problem 2678

Solve 1712%17 \frac{1}{2} \% of what number is 21?21 ? 1712%17 \frac{1}{2} \% of \square is 21. (Type an integer or a decimal.)

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Problem 2679

Question Show Exam
Find the distance between the two points in simplest radical form. (8,6) and (3,6)(8,6) \text { and }(3,-6)

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Problem 2680

Question Find the distance between the two points in simplest radical form. (8,3) and (1,4)(-8,-3) \text { and }(-1,4)
Answer Attempt 1 out of 2

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Problem 2681

Find the distance between the two points (5,9) and (4,3).\text{Find the distance between the two points } (-5, 9) \text{ and } (4, -3).

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Problem 2682

Find the distance between the points (7,0)(7,0) and (2,9)(2,-9). Write your answer as a whole number or a fully simplified radical expression. Do not round. \square units

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Problem 2683

13. What is the area of the red ribbon? Suppose we have a right
A Area =2π(10)2354=2 \pi(10) \cdot 2 \cdot 35 \cdot 4 cylinder with a ribbon pained on the outside. Suppose the cylinder's rdius r=10r=10 and the cylinder's height is h=35h=35, also assume the horizontal width of the ribbon is x=2x=2, more-
B Area =90=90 over assume the ribbon makes exactly 4 revolutions around the cylinder. What is the area of the painted ribbon?
C Area =100=100 D Area =2π(10)24=2 \pi(10) \cdot 2 \cdot 4 E Area =70=70 F Area =π(10)2235=\pi(10)^{2} \cdot 2 \cdot 35 G Area =70π=70 \pi H there is not enough information to determine the area I Area =2π(10)22354=2 \pi(10)^{2} \cdot 2 \cdot 35 \cdot 4 (C)2019 danbz.com PreCalculus Quiz 10 version 1 page 2 of 5

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Problem 2684

Find the distance between the points (8,1)(-8,-1) and (3,6)(-3,-6). Write your answer as a whole number or a fully simplified radical expression. Do not round. \square units

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Problem 2685

Question 5 Use algebra to find the inverse of the function f(x)=2x9+1f(x)=-2 x^{9}+1 The inverse function is f1(x)=f^{-1}(x)= \square

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Problem 2686

O Polynomial and Rational Functions Using the rational zeros theorem to find all zeros of a polynomial: Compl...
The function below has at least one rational zero. Use this fact to find all zeros of the function. g(x)=5x3+6x2+16x+3g(x)=5 x^{3}+6 x^{2}+16 x+3
If there is more than one zero, separate them with commas. Write exact values, not decimal approximations. \square Explanation Check @ 2024 McGraw Hill LLC. All Rights Reserved. Terms

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Problem 2687

Jenna has 131 dog biscuits. She wants to give them as gifts to each of her 4 poodles. How many biscuits does each poodle get? (Assume each gets the same number of biscuits.)
Choose 1 answer: (c) Each poodle gets 524 biscuits because 131×4=524131 \times 4=524.
Each poodle gets 32 biscuits because 131÷4=32131 \div 4=32 remainder 3 . Each poodle gets 33 biscuits because 131÷4=32131 \div 4=32 remainder 3 .

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Problem 2688

Find the distance between the two points in simplest radical form.

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Problem 2689

Section 5.2 Problem 31 An investment initially worth $5300\$ 5300 earns 7.5%7.5 \% annual interest, and an investment initially worth $7900\$ 7900 earns 5.8%5.8 \% annual interest, both compounded annually.
How long will it take for the smaller investment to catch up with the larger one?
It will take \square years.

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Problem 2690

Suppose x+1x=1x+\frac{1}{x}=1 compute the value of x2133+x2133x^{2133}+x^{-2133} A) 12133\frac{-1}{2133} B) 12133\frac{1}{2133} C) xx D) 1x2133\frac{1}{x^{-2133}} E) 1 F) 1x\frac{1}{x} G) 2 H) 3 I) 1x2133\frac{1}{x^{2133}}

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Problem 2691

Jenna's dogs used 9 chew toys last year. The animal shelter used 2,277 chew toys.
How many times as many chew toys did the animal shelter use?
Choose 1 answer: (A) The animal shelter used 20,493 times as many chew toys, because 9×2,277=20,4939 \times 2,277=20,493. B The animal shelter used 2,053 times as many chew toys, because 2,277÷9=2,0532,277 \div 9=2,053. (C) The animal shelter used 253 times as many chew toys, because 2,277÷9=2532,277 \div 9=253.

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Problem 2692

Next question Get a similar ques given f(x)=13x64x9f(x)=\frac{13 x-6}{-4 x-9}, find f1(x)f^{-1}(x)

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Problem 2693

The function hh is defined by the following h(x)=4x4h(x)=-4 x-4
Complete the function table. \begin{tabular}{|c|c|} \hlinexx & h(x)h(x) \\ \hline-3 & \square \\ \hline 0 & \square \\ \hline 3 & \square \\ \hline 4 & \square \\ \hline 5 & \square \\ \hline \end{tabular}

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Problem 2694

Divide: 4,081÷17=4,081 \div 17= \square R \square Submit

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Problem 2695

Karen and Wayne need to buy a refrigerator because theirs just broke. Unfortunately, their savings account is depleted, and they will need to borrow money in order to buy a new one. Sears offers them an installment loan at 12\% (add-on rate). The refrigerator at Sears costs $1,578\$ 1,578 plus 5%5 \% sales tax, and Karen and Wayne plan to pay for the refrigerator for 3 years. (Round all answers to the nearest cent.)
Find the total cost of the refrigerator, including sales tax. \ \squareFindtheinterestowedonthis3yearinstallmentloan.$ Find the interest owed on this 3-year installment loan. \$ \squareFindthetotalloanamount.$ Find the total loan amount. \$ \squareWhatisthemonthlypayment?$ What is the monthly payment? \$ \square$

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Problem 2696

Divide: 16,500÷330=16,500 \div 330= \square R \square Submit

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Problem 2697

Consider the following functions. f(1)=3 and g(1)=15f(1)=3 \text { and } g(1)=-15
Step 1 of 4: Find (f+g)(1)(f+g)(1).
AnswerHow to enter your answer (opens in new window) 2 Points (f+g)(1)=(f+g)(1)= \square

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Problem 2698

PQR\triangle P Q R is an equilateral triangle, PQ=18x+1,gR=24x17P Q=18 x+1, g R=24 x-17, and PR=15x+10P R=15 x+10 find xx and e measure of each side. \qquad

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Problem 2699

Divide: 41,885÷274=41,885 \div 274= \square R \square
Submit

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Problem 2700

Divide: 39,973÷17=39,973 \div 17= \square R \square Submit

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